Thermodynamics of some binary liquid mixtures containing aliphatic

Francisco A. Sánchez , Amir H. Mohammadi , Alfonsina Andreatta , Selva Pereda , Esteban Brignole and Dominique Richon. Industrial & Engineering Chemi...
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Thermodynamics of Some Binary liquid Mixtures Containing Aliphatic Amines TREVOR M. LETCHER' and JOHN W. BAYLES2 Department of Chemistry, University of Natal, Durban, South Africa

Excess molar quantities of mixing (volumes, refractions, enthalpies, and Gibbs free energies) have been measured for most binary systems generated by benzene, chlorobenzene, n-heptane, n-butylamine, diethylamine, and triethylamine. Antoine equations for the vapor pressures of the pure components have also been determined. Improved values are reported for the physical constants of diethylamine and n-butylamine.

T h e purpose of this work is to accumulate complete thermodynamic data suitable for later use in an evaluation of the molecular origin and theories of so-called strong interactions in liquid mixtures. Despite the large amount of published material on the thermodynamics of liquid mixtures, there are few data suitable for the above purpose.

oxide for several days and twice distilled using the above column. The physical properties of the liquids are shown in Table I. METHODS AND RESULTS

EXPERIMENTAL Materials. The three amines-n-butylamine, diethylamine, and triethylamine (British Drug Houses)-were allowed to stand over sodium hydroxide pellets for several days. They were then twice distilled using a reflux ratio of 5 to 1 through a 3-m straight column (internal diameter 30 mm) packed with borosilicate glass pieces. The middle fractions were retained. There is a confusion in the literature on the physical constants of diethylamine and n-butylamine. I n this work the criterion of purity was concurrent constancy of boiling point, density, and refractive index. The densities of diethylamine and n-butylamine recorded after the first distillation were higher than the literature values, but after a second and third distillation, the values become lower. These lower values are given in Table I. Benzene (May and Baker) was recrystallized six times, dried over sodium hydroxide pellets for several days, and twice distilled using the above column. n-Heptane (standard samples were from the local Shell and Mobil refineries) was dried over sodium hydroxide and distilled, but no change in density or refractive index was detected. Chlorobenzene (May and Baker) was dried over phosphoric I Present address, Department of Chemistry, University of the Witwatersrand, Johannesburg, South Africa. 'To whom correspondence should be addressed.

Temperature. To establish the temperature scale, a platinum resistance thermometer (Tinsley) was calibrated by the CSIR Standards Laboratory, Pretoria, in conjunction with a Muller bridge (Rubicon, Philadelphia) according to the 1948 temperature scale. Throughout the temperature range used in this work, the precision of calibration was better than 0.01" C. All temperatures quoted are according to the 1948 scale. The various thermometric devices used in the parts of this work were referred to this thermometer in thermostats controlling to better than 0.005°C, and a precision of 0.010C was achieved. Sample Analysis. The liquid samples were analyzed by one of the following methods: density, refractive index, and, for amines, nonaqueous titration against perchloric acid. The density and refractive index methods involved reference to large-scale graphs. The composition of samples could always be estimated to within 0.005 mole fraction by using one or another of these methods. Density. Densities of pure liquids and mixtures were obtained using Sprengel-Ostwald pycnometers (capacity ca. 20 cm3) fitted with capillary arms of internal diameter 0.5 mm. The temperature was controlled a t 25.00° O.0loC. The weights of the pycnometers and flasks were corrected for buoyancy and residual vapors. The pycnometers were calibrated using distilled water. The accuracy and precision of the measurements are within =tO.OOOl and are referred to water at 4" C.

+

Table I. Physical Properties

Normal bp, ' C Our Lit. value value

Relative density, d:" Ref.

Our value

n-Heptane Benzene Chlorobenzenk

98.42 80.11 131.72

98.43 80.10 131.72

(16) (15) ( 3)

0.67952 0.87365 1.1011

n-Butylamine Diethylamine Triethylamine

76.97 55.33 89.20

77.4 55.45 89.5

(19) (17) (18)

0.73310 0.6990 0.72305

266 Journal of Chemical and Engineering Data, Vol. 16, No. 3, 1971

Refractive index. n?? Lit. value Ref.

Lit. value

Our value

0.67951 0.87370 1.10118 1.101121 0.7346 0.7016 0.7230

1.3851 1.4979 1.52185

1.3851 1.49792 1.5219

(16) (15) (3)

1.3987 1.3820 1.3980

1.3987 1.3825 1.3980

(1 7 )

(19) (18)

points were used in each curve fit. The results and the standard deviations, U , are presented in Table 11. This presentation carries all the experimental results in a compact way and shows the precision obtained. Excess Molar Volume. Volume changes of mixing were calculated from the individual density data (not from the

The density measurements on the mixtures were fitted to polynomials of the form: d:" = A + Bx

+ Cx' + Dx'

by a method of least squares (IBM library program 1620,07,0.002) using an IBM 1620 computer. A t least 18

Table II. Relative Densities of Liquid Mixtures

d:' = A

+ Bx + Cx'+

Dx'

x is the mole fraction of the first-named component, and

Benzene + n-heptane Chlorobenzene + n-heptane n-Butylamine + n-heptane Diethylamine + n-heptane Triethylamine + n-heptane n-Butylamine + benzene Diethylamine + benzene Triethylamine + benzene n-Butylamine + chlorobenzene Diethylamine + chlorobenzene Triethylamine + chlorobenzene Chlorobenzene + benzene Diethylamine + triethylamine Triethylamine + n-butylamine Diethylamine + n-butylamine

a

the standard deviation

A

100 B

l o Jc

0.67936 0.67945 0.67944 0.67961 0.67950 0.87349 0.87376 0.87357 1.10114 1.1009 1.10109 0.87356 0.72310 0.73311 0.73319

11.663 29.776 2.102 0.320 3.921 -16.902 -20.734 -23.439 -35.260 -38.153 -47.938 25.987 -1.929 -1.145 -3.224

13.60 78.66 24.53 6.4 4.35 36.39 41.05 118.55 -15.41 -24.50 122.13 -36.76 -4.72 1.38 -1.99

io3D

IO' a

63.69 45.17 8.06 9.8

2.6 0.9 0.7 0.6 0.5 1.2 1.1 0.7 1.2 2.0 0.9 0.6 0.6 0.4 0.2

-7.64 -8.47 -34.8 3.99 -20.75 4.42

Table Ill. Excess Molar Volumes of Mixing

VL/cm' = x ( l

- x ) [ A+ B ( l - 2 x) + C (1 - 2 x)' + D (1 - 2 x ) ~ ]

x is the mole fraction of the first-named component, and

Benzene + heptane ( 4 ) Benzene + heptane Chlorobenzene + heptane n-Butylamine + heptane Diethylamine + heptane Triethylamine + heptane Chlorobenzene + benzene n-Butylamine + benzene Diethylamine + benzene Triethylamine + benzene n-Butylamine + chlorobenzene Diethylamine + chlorobenzene Triethylamine + chlorobenzene Diethylamine + n-butylamine Triethylamine + n-butylamine Diethylamine + triethylamine

u

the standard deviation

No. of points

A

B

C

15 17 20 25 19 21 21 23 17 21 18 18 20 17 23 17

2.3648 2.31396 -0.91162 2.7892 2.6325 0.4335 0.0331 1.1217 0.1244 0.0232 -0.648 1 -3.1641 -3.6480 -0.5199 -0.2214 0.3987

-0.3177 -0.5905 0.35067 0.5258 -0.3153 -0.0380 -0.0178 0.2060 0.3669 0.3573 0.1636 0.3627 0.2858 0.0031 0.0228 0.0560

0.15316 0.1996 -0.2616 0.3419 -0.1692 -0.0287 0.0308 0.0831 -0.2550 -0.1874 0.0033 0.3661 0.2867 -0.0033 -0.1378 -0.1028

Table IV. Refractive Indexes, nf, and Maximum Excess Molar Refractions,

ng= A

D

1O3a/cm3

0.8204

7 14 14 16

0.6557 0.4043 0.2389

0.3532

11

7 9 9 4 5 7 19 13 3 5 5

[ R E I m a x , of Mixtures

+ Bx + Cx2+ Dx3

x is the mole fraction of the first-named component, and u the standard deviation

Benzene + n-heptane Chlorobenzene + n-heptane n-Butylamine + n-heptane Diethylamine + n-heptane Triethylamine + n-heptane n-Butylamine + benzene Diethylamine + benzene Triethylamine + benzene n-Butylamine + chlorobenzene Diethylamine + chlorobenzene Triethylamine + chlorobenzene Chlorobenzene + benzene Diethylamine + triethylamine Triethylamine + n-butylamine Diethylamine + n-butylamine

A

100 B

1.38485 1.38519 1.38512 1.38521 1.38516 1.49793 1.49805 1.49781 1.52196 1.52176 1.52183 1.49800 1.3980 1.3987 1.3986

6.457 9.565 0.372 1.01 1.065 -12.172 -13.726 -1 5.984 -11.683 -12.677 -15.159 2.836 -1.284 -0.07 -1.55

io3c 6.71 28.71 2.79 6.85 2.18 31.07 24.26 83.63 -6.30 -14.78 32.29 -4.50 -3.0 -0.0011

[R3E1max,

io3D

10' a

cm mol-'

41.57 12.28 7.01

2.8 0.9 1.1 0.9 0.7 1.4 1.2 0.8 2.0 0.9 0.7 1.1 0.6 0.6 1.0

0.01 0.09 0.03 0.03 0.00 0.03 0.05 -0.01 0.08 0.08 0.04 0.01 0.00 -0.02 0.00

-8.63 -3.01 -23.67 1.86 -4.52

Journal of Chemical and Engineering Data, Vol. 16, No. 3, 1971 267

density polynomials) and fitted to:

where x is the mole fraction of the first-named compound in Table 111. To determine A , , the least-squares program minimized

where n is the number of data points. The parameters A , were rounded off, and u was recalculated. I n the worst case the recalculated value differed from the original by 0.0001 cm3 which is within the experimental precision. The rounded parameters are given in Table 111. Refractive Index. Refractive indexes were determined using a thermostated calibrated Bellingham and Stanley type 60 Abbe refractometer. Effects due to evaporation and contamination by moisture were avoided by reducing the time required to transfer samples to the refractometer and to take measurements. Conditions were established by studying the effect of using various time intervals and various conditions. To avoid interpolation of density results in the calculation of molar refractions, aliquots were drawn from the same batch of mixture for both refractive index and density determinations. These refractive index measurements were reproducible to within kO.0001. The results in polynomial form are given in Table IV, and the explanatory comments under the heading Density apply. Excess Molar Refraction. The same treatment was applied to molar refractions, (n'- l)i(n'+ 2)V (=[RIE),

as to the molar volumes, V, to obtain the excess quantities. These quantities are, however, very small, though significant. The precision of measurement does not justify fitting to a polynomial in composition, but the maximum values (all occurring in the region near x = 0.5) are significant and are listed in column 7 of Table IV. To permit discussion of the significance of these results, we have made a survey of published [ R E ]values and of results where both density and refractive index have been measured on the same mixture, and [RIEvalues have been calculated for these. This collection is given in Table V. Calorimetry. Heats of mixing were determined a t 25" and 450 k 0.010C in an insulated all-glass U-tube calorimeter similar to types in the literature (14, 15). This cell was mounted in a sealed evacuable brass cylinder immersed in a water bath set a t the correct temperature. The two liquids to be mixed (total charge ca. 17 cm3) were separated by mercury (300 grams) in the U-tube which, on inversion, caused mixing to take place. Gentle rocking of the metal cylinder ensured good mixing. The temperature change was determined from a graphical extrapolation of resistance values obtained from a calibrated thermistor (Standard Telephone and Cables type F23) conveniently mounted in the U-tube. This is the technique used by Brown and Fock ( 5 ) . The temperature change was calibrated against potentiometrically measured energy by electrically heating the cell using nichrome wire (75 cm) wound outside its glass walls. The metal cylinder was not evacuated since an asbestos paper insulation surrounding the cell was sufficient to allow temperature changes to be measured to within 0.01" C. To check the technique and apparatus, reliable results from the literature were repeated. The systems were benzene + carbon tetrachloride ( 6 ) , benzene + methanol (IO), and benzene + n-heptane (8). 268

Journal of Chemical and Engineering Data, Vol. 16, No. 3, 1971

Excess Enthalpy. The individual enthalpy results are given in Table VI. The estimated accuracy of the measurements was 1 2 0 J or 1570, whichever is the greater. The data in Table VI were fitted to equations like Equation 2 . The standard deviation was of the same form as that already explained, and the same rounding off procedure was used and justified in the same way. The rounded parameters are given in Table VII. Equilibrium Still Measurements. The excess free energy measurements were made using an Othmer-type vacuumjacketed equilibrium still, designed to measure both liquid and vapor concentrations (13). The boiling temperature was kept constant to within 0.02O C measured by a precision

Table V. Excess Molar Refractions of Mixing

[ R1m ;,

cm3 mol-'

Carbon tetrachloride Methyl cyclohexane Carbon tetrachloride Carbon tetrachloride Carbon tetrachloride Carbon tetrachloride n-Butyl alcohol n-Butyl alcohol n-Butyl alcohol Methanol Ethanol n-Butyl alcohol +Butyl alcohol Isobutyl alcohol &Butyl alcohol Ethanol Isopropyl alcohol Benzene Benzene Benzene Benzene Benzene To1u en e Bromobenzene Chlorobenzene Benzene Benzene Benzene Benzene Chlorobenzene Benzene Benzene Benzene Benzene Benzene Benzene Benzene Benzene Dimethyl aniline o-Chlorophenol Acetic acid Acetic acid Acetic acid Ethanol Ethanol Chloroform Dichloromethane Chloroform Carbon tetrachloride Dichloromethane Acetone Dioxane Dimethyl formamide Dimethyl sulfoxide Diethylamine

Ethyl acetate Heptane Cyclohexane Cyclohexane Dioxane Methyl acetate Isobutyl alcohol Isopropyl alcohol Isoamyl alcohol Dioxane Dioxane Dioxane Dioxane Dioxane Dioxane Methyl cyclohexane n-Hexane Cyclohexane Dioxane Cyclopentane n-Hexane n-Heptane Methyl cyclohexane 2,2,4-trimethyl pentane n-Hexane Butyl bromide Methanol Isopropyl alcohol Carbon tetrachloride Carbon tetrachloride Chlorobenzene Chlorobenzene Anisole Bromobenzene Benzonitrile Phenol Aniline Aniline Benzene Aniline o-Toluidine Aniline Dioxane Carbon tetrachloride Carbon tetrachloride Carbon tetrachloride Carbon tetrachloride Pentachloroethane Pentachloroethane Chloroform Chloroform Water Water Water Water

0.015 0.00 0.01 0.02 0.00 0.00 0.00 0.00 0.02 -0.01 0.00 0.00 0.02 0.00 0.02 0.01 0.01 0.02 0.02 0.01 0.04 0.01 -0.02 0.10

0.07 -0.02 0.04 0.04 0.06 0.09 0.00 0.01 0.00 0.02 0.03 0.00 0.01 -0.01 -0.03 -0.06 -0.12 -0.09 -0.08 0.01 -0.01 -0.05 0.14 0.13 0.04 0.20 0.10 -0.05 0.04 1.3 -0.07

Table VI. Excess Enthalpies of Mixing (J Mol-') Mole fractions x refer to the first-named component

Hf%

X

Hh

X

HZ

X

Benzene t n-Heptane 0.307 0.355 0.602 0.610 0.616 0.648 0.691 0.885

702 773 946 955 911 889 863 467

0.162 0.266 0.421 0.466 0.576 0.621 0.762 0.859

280 549 699 728 722 701 483 290

555 628 670 652 630 625 573 548

0.165 0.492 0.532 0.573 0.653 0.786 0.914

240 277 315 320 319 305 224

0.123 0.213 0.317 0.395 0.479 0.502 0.731 0.777

-64 -92 -115 -110 -108 -117 -72

0.123 0.370 0.511 0.512 0.533 0.846

+ Benzene

+ Chlorobenzene

-73 -90 -121 -124 -120 -113 -64

0.210 0.305 0.471 0.486 0.508 0.531 0.771

0.315 0.502 0.549 0.585 0.662 0.672 0.752

19 82 110 86 64 46 18

151 237 309 326 318 331 250 225

X

HL

0.335 0.374 0.402 0.552 0.621 0.628 0.732 0.741

n-Butylamine + 1254 1296 1305 1311 1151 1156 907 868

H b ! J mol-' = x ( l - x ) [ A + B ( l - 2 x)

491 606 607 603 556 555 451

0.303 0.462 0.535 0.555 0.656 0.710

n-Butylamine 78 96 94 91 82 74

+ Benzene 0.209 0.251 0.321 0.399 0.523 0.705 0.837

225 263 324 350 363 306 189

0.185 0.239 0.278 0.395 0.422 0.544 0.648 0.799

376 460 516 607 686 674 562 409

X

n-Heptane 0.325 0.442 0.484 0.516 0.549 0.688

ht18 1200 1281 1275 1241 1225 1003

+ Benzene 0.301 0.427 0.492 0.512 0.515 0.563 0.651

648 720 689 709 698 696 600

n-Butylamine + Chlorobenzene 393 0.269 269 0.370 374 0.298 285 0.418 0.332 315 0.472 394 403 0.485 331 0.504 392 341 0.521 0.505 0.588 276 0.748 250 0.629 260 0.667 257

Triethylamine + Chlorobenzene -51 -103 -93 -100 -106 -62

Table VII. Excess Molar Enthalpies of Mixing

+ C(l - 2 x I 2 + D ( l - 2 x ) ~ ]

x is the mole fraction of the first-named component, and standard deviation

Benzene + heptane Chlorobenzene + heptane n-Butylamine + heptane Diethylamine + heptane Triethylamine + heptane n-Butylamine + benzene Diethylamine + benzene Triethylamine + benzene n-Butylamine + chlorobenzene Diethylamine + chlorobenzene Triethylamine + chlorobenzene

HOE

+ n-Heptane

Triethylamine

0.233 0.301 0.396 0.462 0.492 0.556 0.731

Diethylamine 0.167 0.251 0.401 0.586 0.592 0.618 0.856

Triethylamine

0.324 0.411 0.562 0.572 0.606 0.612 0.643 0.686

236 335 333 294 232 180

228 489 488 635 665 665 628 313

0.166 0.315 0.338 0.547 0.548 0.579 0.614 0.865

+ n-Heptane

Diethylamine 0.207 0.366 0.469 0.622 0.764 0.799

857 848 872 797 809 752 620

0.508 0.553 0.572 0.667 0.689 0.695 0.795

Diethylamine

X

Chlorobenzene t n-Heptane

Temp, OC

A

B

25 45 25 45 25 45 25 45 25 45 25 45 25 45 25 45 25 45 25 45 25 45

3676 3414 2592 2441 5284 5047 2969 2684 335 379 2671 2829 1329 1258 1318 1479 1283 1580 -498 -453 -406 -303

-1012 -576 -757 -282 1174 1120 -215 -25 -68 17 58 580 268 200 126 -27 806 -508 1 1 -11

-108

c

D

-932 -507 -711 305 -1442 -1327 -316 -88 -536 118 91 -226 12 1493 159 -145 340

-3271 7157

u

is the

o/cm3 14 14 10 6 13 7 13 12 6 2 10 15 9 5 8 7 7 10 4 4 7 7

0.285 0.348 0.358 0.362 0.517 0.621

-64 -60 -81 -71 -80 -58

platinum resistance thermometer. The pressure was maintained constant by an electronically regulated dry air leak into a continuously pumped line connected to a 20-liter ballast bottle. This pressure could be maintained to within 0.1 torr for an indefinite period. The vapor from the still was trapped from the rest of the line by condensers through which iced water was circulated. The charge in the still was ca. 160 cm3. The recycling rate was estimated to be between 2 and 4 cm3 per minute depending on the volatility of the mixture. I n all cases measurements were taken only after the boiling temperature had remained constant for at least 2 hr. The only difficulty we had with this still was poor mixing between the liquid in the receiver and that in the still when one was very much more volatile than the other. This was particularly noticeable with certain chlorobenzene mixtures and restricted the range of composition used. The apparatus was checked by repeating the results of Brown and Ewald ( 4 ) for the benzene + n-heptane system a t 60" and 80° C. The excess free energy curve obtained for this system was always within 10 J mole-' of the quoted values. As the Othmer still is known to produce results of poor quality for certain mixtures, all our results were tested using the Redlich-Kister thermodynamic consistency test. The experimental values of RT In y l and RT In y2 were plotted separately against xi, and the difference between the areas under the two curves was measured. This amounted to 6% in the worst case. Experimental errors in RT In yl, and RT In 7 2 could cause a difference of 12% between these areas. Journal of Chemical and Engineering Data, Vol. 16, No. 3, 1971

269

Table VIII. Constants for Antoine Equations

logiolP/torrJ = A

- [B/(C + t / " C ) ]

Measurements are spaced equally through the temperature range indicated

Chlorobenzene Benzene n-Heptane n-Butylamine Triethylamine Diethylamine

A

B

C

u, torr

Number of points

7.0338 6.9784 6.8662 7.1386 7.1512 6.84312

1464.638 1254.734 1246.43 1258.745 1398.54 1058.538

221.03 226.120 214.35 218.66 238.30 211.819

0.1 0.3 0.3 0.2 0.2 0.2

15 21 15 22 17 29

The temperature range over which good results can be obtained depends on the boiling points of the components of any one mixture. The most favorable temperature range for each system was chosen, and afterward the values were adjusted to a common temperature.

Range of temperature, C 62 to 52 to 60 to 40 to 51 to 29 to

114 80 98 77 84 55

Table X. Excess Molar Gibbs Free Energies of Mixing

G'/J mole-' = x(1 - r)[A + B(l - 2 x )

+ C(1 - 2 x ) ' + D(l - 2 x ) ~ ]

x is the mole fraction of the first-named component, and u is the

standard deviation VAPOR PRESSURE OF COMPONENTS

Temp,

Vapor pressures were determined in the equilibrium still at fourteen or more temperatures and the results were fitted by computer (IBM 1620) to the Antoine equation: log P = A - [B/(C + t)]

(3)

A damped least-squares regression technique based on a method of Law and Bailey (7) was used. The values of the constants and the standard deviations, 6, of the pressures are given in Table VIII. Excess Free Energy. The excess free energy was determined for each system a t two temperatures using the following equation in which the usual meanings are given to the symbols: pf

= RT In V, = RT In Py,/P,x, + ( V ,- 6,)(P,- P )

(4)

where i = 1,2 (components) G" = r i p :

+ ~2p2L

The vapor pressure values required (PI, P,) were calculated from Equation 3. The second virial coefficients were calculated from critical constants obtained from the literature using the Berthelot equation. The densities of the liquids a t the various temperatures were determined from experimental density values measured a t 25" C, and coefficients of cubic expansion were obtained from the literature. Table IX. Example of Excess Free Energy Results

Mole fractions xl, yl, refer to the liquid and vapor phases, respectively, of the first-named component. The detailed results for the remaining systems have been deposited with ASIS. See note a t the end of this article

GE

G" (80"C)

(60" C)

P,

J,

x1

yl

torr

mole-'

0.000 0.034 0.056 0.160 0.220 0.272 0.315 0.476 0.565 0.609 0.716 0.901 1.000

0.000 0.077 0.125 0.293 0.379 0.446 0.493 0.640 0.701 0.731 0.795 0.911 1.000

210.35 221.5 228.6 258.7 275.1 289.4 299.1 333.6 348.4 355.0 369.1 387.0 391.8

0.0 37.9 57.2 157.8 194.8 227.1 241.8 291.3 299.1 293.0 266.6 131.2 0.0

270

XI

yl

0.00 0.00 0.024 0.049 0.150 0.268 0.165 0.288 0.201 0.343 0.232 0.380 0.288 0.444 0.383 0.544 0.383 0.544 0.550 0.678 0.621 0.725 0.711 0.788 1.000 1.000

P,

J,

torr

mole-'

428.2 440.7 507.4 515.1 533.3 548.8 572.9 612.8 613.0 670.2 689.9 712.8 757.9

0.0 18.6 119.8 134.6 151.6 179.4 205.7 239.8 240.7 271.7 268.8 242.4 0.0

Journal of Chemical and Engineering Data, Vol. 16, No.

3, 1971

OC

Benzene + heptane Chlorobenzene + heptane n-Butylamine+ heptane Diethylamine + heptane Triethylamine t heptane n-Butylamine + benzene Diethylamine + benzene Triethylamine + benzene n-Butylamine + chlorobenzene Diethylamine + chlorobenzene Triethylamine + chlorobenzene

60 80 80

100 55 75 35 55 60 80 50 70 35 55 60 80 60 80 60 40 70 90

A 1181 1073 1571 1481 1938 1694 993 819 63.5 50.4 596.3 522 291 249 489 438 647 607 420 409 658 706

B

C

-199 -228 -344 -242 -85 44 -10 127 -31.3 -5.5 98.5 110 -12 -49 147 205 -106 -47 -181 -245 -85 -55

214 88 221 253 195 143 290 182 -7.1 7.5 141.4 65 117 162 -42 -112 270 377 290 248 273 67

D

-274 478 217 -149 -117.2 -222 -99 -182 199 -124 -242 -258

o 3 3 4 4 5 5 4 3 0.5 0.6 0.8 3 2.4 2 1 1

3 3 4 4 4 4

Equation 4 may be written with a term in 012. This term was not included as it was considered negligible compared to the experimental error. The estimated precision of the results was f 1 0 J. An example of the equilibrium still measurements of free energies of mixing is given in Table IX, and the full table covering all systems is deposited with the American Society for Information Science ( 7 u ) . The equations for the excess molar free energies as a function of concentration were computed using the program that was used to calculate the heats of mixing equations. The parameters of the excess free energy equation for all systems are given in Table

X. ACKNOWLEDGMENT

The authors wish to thank C. P. Hicks of Bristol University for assisting with the curve-fitting program. NOMENCLATURE

dy = relative density a t 25" C referred to water a t 4" C x , = mole fraction of component i in liquid phase = excess molar volume of mixing n = refractive index [R]E = excess molar refraction of mixing Y = mole fractional activity coefficient referred to pure component as standard state

v"

P = vapor pressure

P, = partial vapor pressure of component i E

fit

a

= excess partial molar free energy of component i in liquid mixture referred to the pure component as standard state mole fraction of component i in vapor phase excess free energy of one mole of liquid mixture second virial coefficient of component i a t pressure P, mixed second virial coefficient (cross-term) between components 1 and 2 in the vapor = standard deviation

LITERATURE CITED (1) Bittrich, H. J., Langguth, V. U., Kraft, G., Wiss. Z. Tech.

(2)

(3) (4) (5) (6) (7) (7a)

(8) (9) (10) (11)

(12) (13) (14) (15)

(16) (17)

Hochsch. Chem. (Leuna-Merseburg), 8 , 154 (1966). Bottcher, C. J. F., “Theory of Electric Polarization,” 1952, p 269, Elsevier, Amsterdam. Brown, I., Aust. J . Sci. Res., A5, 530 (1952). Brown, I., Ewald, A. H., ibid., A4, 198 (1951). Brown, I., Fock, W., A u t . J . Chem., 8 , 361 (1955). Cheeseman, G. H., Whittaker, A. M. B., Pmc. Roy. SOC. (London), A212, 406 (1952). Law, V. J., Bailey, R. V., Chem. Eng. Sci., 18, 189 (1963). Letcher, T. M., Bayles, J. W., full Table IX deposited with National Auxiliary Publications Service. Lundberg, G. W., J . Chem. Eng. Datu, 9, 193 (1964). Martin, A. R., Collie, B., J . Chem. SOC. (London), 2658 (1932). Murti, P. S., van Winkle, M., Id.Eng. Chem., Chem. Eng. Datu Ser., 3, 65 (1958). Nyvlt, J., Erdos, E., Coll. Czech. Chem. Comm., 26, 500 (1961). Nyvlt, J., Erdos, E., ibid., 27, 1229 (1962). Othmer, D. F., Gilmont, R., Conti, J. J., J . Chem. Eng. Data, 5 , 625 (1960). Scatchard, G., Tickner, L. B., Goates, J . R., McCartney, E. R., J . Amer. Chem. SOC.,74, 3721 (1952). “Selected Values of Physical and Thermodynamic Properties of Hydrocarbons and Related Compounds,” American Petroleum Institute Research Project 44, p 71, Carnegie Press, Pittsburgh, Pa., 1953. Ibid., p 38. “Selected Values of Properties of Chemical Compounds”

(Manufacturing Chemists Association Research Project, College Station, Tex.), table 23-18-2-(1.0123) (1961). Ibid., table 23-18-2-(1.0133)(1963). Ibid., table 23-18-2-(1.0111)(1961). Timmermans, J., “Physicochemical Constants,” 1965, Vol. 11, p 332, Elsevier, Amsterdam. Timmermans, J., “Physicochemical Constants of Binary Systems,” 1959, Vol. I, p 72, Interscience, London. Timmermans, J., ibid., pp 210-12. Timmermans, J., ibid.,pp 708-09. Timmermans, J., ibid., p 716. Timmermans, J., ibid., Vol. 11, p 1122. Timmermans, J., ibid., p 1121. Timmermans, J., ibid., p 1123. Timmermans, J., ibid., p 431. Timmermans, J., ibid., pp 432-3. Timmermans, J., ibid., p 434. Timmermans, J., ibid., p 42. Timmermans, J., ibid., Vol. I, pp 107-10. Timmermans, J., ibid., p 448. Timmermans, J., ibid., pp 114-15. Timmermans, J., ibid., p 203. Timmermans, J., ibid., p 260. Timmermans, J., ibid., Vol. 11, pp 80-4. Timmermans, J., ibid., Vol. I, pp 550-51. Timmermans, J., ibid., p 553. Timmermans, J., ibid., Vol. 11, p 711. Timmermans, J., ibid., p 832. Timmermans, J., ibid., pp 817-19. Timmermans, J., ibid., p 461. Timmermans, J., ibid., pp 283-5. Timmermans, J., ibid., Vol. I, pp 685-9. Timmermans, J., ibid., Vol. IV, pp 12-15. Wood, S. E., Masland, C. H., J . Chem. Phys., 32, 1385 (1960). RECEIVED for review June 9, 1969. Accepted December 23, 1970. The South African Council for Scientific and Industrial Research was responsible for a bursary to TML and for a capital equipment grant. For supplementary material, Table IX, order NAPS Document No. 01323 from ASIS National Auxiliary Publications Service, % CCM Information Sciences, Inc., 909 Third Ave., New York, N. Y. 10022, remitting $2.00 for microfiche or $5.00 per photocopy.

Enthalpies of Cyclohexane and Mixtures

of n-Pentane and Cyclohexane JOHN M. LENOIR and GEORGE K. KURAVILA University of Southern California, Los Angeles, Calif. HOWARD G . HlPKlN C. F. Braun & Co., Alhambra, Calif.

90007

91802

A flow calorimeter was used to measure enthalpy for cyclohexane and four mixtures of n-pentane with cyclohexane. The results are presented from 75’ to 680°F, with pressures to 1400 psia.

T h i s experimental s t u d y was u n d e r t a k e n t o d e t e r m i n e the e n t h a l p y of a m i x t u r e of t w o c o m m o n l y encountered hydrocarbons with one component a n a p h t h e n e and t h e o t h e r a paraffin. The h e a t of vaporization of p u r e cyclohexa n e has been measured b y Osborne and Ginnings (9) a n d b y Kozicki a n d Sage ( 4 ) a n d presented b y G r a u e , Berry, a n d Sage ( 3 ) . E n t h a l p y values d o n o t a p p e a r t o h a v e been reported prior t o 1969 for p u r e cyclohexane, nor for mixtures of n-pentane w i t h cyclohexane. P e n t a n e has been measured using t h e a p p a r a t u s used for t h e cyclohexane a n d pentane-cyclohexane mixtures (6). T h e measurements were m a d e b y flowing cyclohexane or t h e cyclohexane-containing mixtures t h r o u g h a t h e r m a l l y

insulated flow calorimeter, which operates isobarically. I n operation, t h e entering hydrocarbon cools from an initially measured t e m p e r a t u r e t o 7 5 “ F , giving u p its e n t h a l p y b y transferring h e a t t o surrounding Freon-1 1 m a i n t a i n e d at its boiling point t e m p e r a t u r e . The m e a s u r e m e n t of b o t h t h e hydrocarbon flow r a t e a n d t h e r a t e of evolution of Freon-1 1 allows c o m p u t a t i o n of t h e e n t h a l p y difference between t h e inlet t e m p e r a t u r e and 75” F. T e m p e r a t u r e s were measured b y calibrated C h r o m e l - C o n s t a n t a n t h e r m o couples that develop 0.04 m v p e r F , resulting in a precision u n c e r t a i n t y of 0 . 2 5 ” F . Heise gages were used t o measure t h e pressure. T h e details of t h e calorimeter h a v e been discussed (6). Besides making measurements with cyclohexJournal of Chemical and Engineering Data, Vol. 16, No. 3, 1971

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